Paucity phenomena for polynomial products
Abstract
Let P(x)∈ Z[x] be a polynomial with at least two distinct complex roots. We prove that the number of solutions (x1, …, xk, y1, …, yk)∈ [N]2k to the equation \[ Π1 i k P(xi) = Π1 j k P(yj)≠ 0 \] (for any k 1) is asymptotically k!Nk as N +∞. This solves a question first proposed and studied by Najnudel. The result can also be interpreted as saying that all even moments of random partial sums 1NΣn Nf(P(n)) match standard complex Gaussian moments as N +∞, where f is the Steinhaus random multiplicative function.
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